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Determine the variation in this unordered data set by finding the range.
12, 13, 18, 21, 17, 12, 12, 21, 18
12, 13, 18, 21, 17, 12, 12, 21, 18
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The range is the difference between the largest value and the smallest value in the data set.
Largest value: 21
Smallest value: 12
Range = 21 - 12 = 9
Therefore, the variation in this data set is 9.
Largest value: 21
Smallest value: 12
Range = 21 - 12 = 9
Therefore, the variation in this data set is 9.
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Determine the variation in this unordered data set by finding the range.
115, 125, 205, 219, 104, 123
115, 125, 205, 219, 104, 123
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The range is the difference between the largest value and the smallest value in the data set.
Largest value: 219
Smallest value: 104
Range = 219 - 104 = 115
Therefore, the variation in this data set is 115.
Largest value: 219
Smallest value: 104
Range = 219 - 104 = 115
Therefore, the variation in this data set is 115.
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Measures of central tendency, or measures of center, help you locate the middle of a data set. In a data set with a distribution that skews like so, data is distributed with a skew to the left.
In the data set below, would the mean, median, or mode be the smallest value?
In the data set below, would the mean, median, or mode be the smallest value?
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Without the data set provided, it's impossible to determine which measure of central tendency (mean, median, or mode) would be the smallest value. Please provide the data set for further assistance.
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sorry
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No problem! Please provide the data set and the question again.
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Which of the data sets below has a range of 15? Select all that apply.
A) 19, 23, 28, 15, 14, 23
B) 19, 19, 21, 25, 13, 17
C) 19, 23, 34, 25, 27
D) 64, 73, 71, 58, 66
E) 96, 94, 93, 81, 85
A) 19, 23, 28, 15, 14, 23
B) 19, 19, 21, 25, 13, 17
C) 19, 23, 34, 25, 27
D) 64, 73, 71, 58, 66
E) 96, 94, 93, 81, 85
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ummm
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bot?
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Oops! I apologize for my previous reply. The correct answer is:
A) 19, 23, 28, 15, 14, 23
The range is the difference between the largest and smallest values in a data set. For option A:
Largest value: 28
Smallest value: 14
Range = 28 - 14 = 15
Therefore, the data set A has a range of 15.
A) 19, 23, 28, 15, 14, 23
The range is the difference between the largest and smallest values in a data set. For option A:
Largest value: 28
Smallest value: 14
Range = 28 - 14 = 15
Therefore, the data set A has a range of 15.
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If you are finding the mean of a data set, do you have to pay attention to every number in that data set?
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Yes, when finding the mean of a data set, you have to pay attention to every number in that data set. The mean is calculated by adding up all of the numbers in the data set and then dividing that sum by the total number of values in the data set. Therefore, each value contributes to the calculation of the mean, and leaving out a number or not paying attention to it would result in an inaccurate calculation.
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Which of the data sets below has a range of 31? Select all that apply.
A) 58, 45, 43, 32, 59, 58
B) 71, 53, 48, 40, 52, 68
C) 14, 18, 11, 34, 19, 22, 34
D) 29, 27, 23, 54, 49, 37
E) 45, 46, 61, 59, 30, 38
A) 58, 45, 43, 32, 59, 58
B) 71, 53, 48, 40, 52, 68
C) 14, 18, 11, 34, 19, 22, 34
D) 29, 27, 23, 54, 49, 37
E) 45, 46, 61, 59, 30, 38
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The data set with a range of 31 is:
E) 45, 46, 61, 59, 30, 38
The range is the difference between the largest value and the smallest value in the data set. For option E:
Largest value: 61
Smallest value: 30
Range = 61 - 30 = 31
Therefore, the data set E has a range of 31.
E) 45, 46, 61, 59, 30, 38
The range is the difference between the largest value and the smallest value in the data set. For option E:
Largest value: 61
Smallest value: 30
Range = 61 - 30 = 31
Therefore, the data set E has a range of 31.
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Select all that apply pls
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I apologize for the mistake in my previous answer. Let me correct it:
The data sets with a range of 31 are:
A) 58, 45, 43, 32, 59, 58
and
E) 45, 46, 61, 59, 30, 38
The range is the difference between the largest value and the smallest value in the data set. For option A:
Largest value: 59
Smallest value: 32
Range = 59 - 32 = 27
For option E, as I calculated previously:
Largest value: 61
Smallest value: 30
Range = 61 - 30 = 31
Therefore, the data sets A and E have a range of 31.
The data sets with a range of 31 are:
A) 58, 45, 43, 32, 59, 58
and
E) 45, 46, 61, 59, 30, 38
The range is the difference between the largest value and the smallest value in the data set. For option A:
Largest value: 59
Smallest value: 32
Range = 59 - 32 = 27
For option E, as I calculated previously:
Largest value: 61
Smallest value: 30
Range = 61 - 30 = 31
Therefore, the data sets A and E have a range of 31.
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it's b, d, and e
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Which example of data set can only be summarized by the mode?
A) Children per household in a country
B) Agreement with a statement
C) Scale from 1 to 10
A) Children per household in a country
B) Agreement with a statement
C) Scale from 1 to 10
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Example B) Agreement with a statement could only be summarized by the mode.
The mode is the value in a data set that appears most frequently. It is used to summarize categorical data, such as responses to a survey question, where each response is assigned to a category (e.g., “strongly agree,” “agree,” “disagree,” “strongly disagree”). In this case, the mode represents the most common response category.
Both A) Children per household in a country and C) Scale from 1 to 10 involve numerical data and can be summarized with measures of central tendency such as the mean and median.
The mode is the value in a data set that appears most frequently. It is used to summarize categorical data, such as responses to a survey question, where each response is assigned to a category (e.g., “strongly agree,” “agree,” “disagree,” “strongly disagree”). In this case, the mode represents the most common response category.
Both A) Children per household in a country and C) Scale from 1 to 10 involve numerical data and can be summarized with measures of central tendency such as the mean and median.
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